T: +44 1246 455500 [email protected] www.ondrives.com Updated July 2021 subject to change for use as a guide only. Gear Technical Gear Technical Description Symbol Unit Equation Normal Module m n Transverse Module m t = m n Normal Pressure Angle α n degrees = 20° Transverse Pressure Angle α t degrees = α n Number of Teeth z Profile Shift Coefficient x = zero for Ondrives standard gears Addendum h a mm = 1.00 · m n (for Ondrives standard gears) Dedendum h f mm = 1.25 · m n (for Ondrives standard gears) Tooth Depth h mm = 2.25 · m n (for Ondrives standard gears) Gear Ratio u = z 2 / z 1 Centre Distance a mm = (d 1 +d 2 ) / 2 Pitch Circle Diameter d mm = z · m n Tip Diameter d a mm = d + (2m n · x) + (2 · m n ) Root Diameter d r mm = d a – (2 · h) Normal Pitch p n mm = π · m n Normal Tooth Thickness in Pitch Circle s n mm = (p n / 2) + 2m n · x · tan α n When working with a pair of gears the subscript 1 and 2 denotes input (drive) and output (driven) gear. Tip diameter is the theoretical diameter of the gear without tooth thickness tolerance applied. For s n when x = zero, this is the theoretical tooth thickness. Actual tooth thickness will be less. The subscript e is for upper allowance values and i for lower allowance values. d a1 d r1 s n p n a d 1 Spur Gears
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T: +44 1246 455500 [email protected] www.ondrives.comUpdated July 2021 subject to change for use as a guide only.
Gear TechnicalGear Technical
Description Symbol Unit EquationNormal Module mnTransverse Module mt = mnNormal Pressure Angle αn degrees = 20°Transverse Pressure Angle αt degrees = αnNumber of Teeth zProfile Shift Coefficient x = zero for Ondrives standard gearsAddendum ha mm = 1.00 · mn (for Ondrives standard gears)Dedendum hf mm = 1.25 · mn (for Ondrives standard gears)Tooth Depth h mm = 2.25 · mn (for Ondrives standard gears)Gear Ratio u = z2 / z1Centre Distance a mm = (d1 +d2) / 2Pitch Circle Diameter d mm = z · mn Tip Diameter da mm = d + (2mn · x) + (2 · mn)Root Diameter dr mm = da – (2 · h)Normal Pitch pn mm = π · mnNormal Tooth Thickness in Pitch Circle sn mm = (pn / 2) + 2mn · x · tan αnWhen working with a pair of gears the subscript 1 and 2 denotes input (drive) and output (driven) gear.Tip diameter is the theoretical diameter of the gear without tooth thickness tolerance applied.For sn when x = zero, this is the theoretical tooth thickness. Actual tooth thickness will be less. The subscript e is for upper allowance values and i for lower allowance values.
da1 dr1
sn
pn
a
d1
Spur Gears
Updated July 2021 subject to change for use as a guide only.
TorqueStated value for metal spur gears is maximum torque (T2) based on two identical gears with the same number of teeth running at standard centres. Value is minimum from surface stress or bending stress.Other factors including duty cycle and temperature will affect maximum allowable torque and service life. Wear is dependant on lubrication. We recommend that each user compute their own values based on actual operating conditions and test in application.
Gear QualityStandard metal gears are supplied to quality Grade 7 DIN 3961 based on Pitch total deviation Fp, Pitch deviation fp, Radial runout Fr and Pitch error fu. Skive hobbed gears are supplied to quality Grade 6 DIN 3961. GG25 Cast Iron, PEEK GF30® and Delrin (POM) are supplied to quality Grade 8 DIN 3961.Ondrives can manufacture gears to higher grades on request. Ondrives can offer testing certification for a gear’s individual parameters using the latest CMM machine with gear measuring software.Double and single flank testing is available on request. Please contact our technical department for details.Comparisons of Grade StandardsExample 3 mod, 50 teeth, 30mm face width spur gear.
Working characteristicsof driving machineUniformLight ShocksModerate ShocksHeavy Shocks
Stated value for plastic spur gears is maximum torque (T2) based on two identical gears with the same number of teeth running at standard centres. Value is minimum from surface stress, bending stress or bulk/surface temperature using method from BS 6168:1987.The torque capacity of plastic gears is highly dependant on operating condition. All values are reference only. We recommend that each user test in application under specific operation conditions of application.
* Reference Only ** Approximate value based on initial light greasing.Maximum torque for titanium gears is approximately 30% of 817M40 steel gears.Due to lack of stress factors we are unable to offer specific values. Testing in application is required.Torque for anti-backlash spur gears is limited by the spring rating. Please contact our Technical department for details.When selecting gears application factors should be applied to required torque. T2 > Trequired x Ka Application factor Ka
MaterialsInput Speed / No. of Load CyclesLimiting Bending StressLimiting Surface StressInitial TemperatureMax. Bulk or Surface TemperatureCoefficient of Friction
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Gear TechnicalGear Technical
da1 dr1
st
pt
aβ
d1
Parallel Helical Gears
Description Symbol Unit EquationNormal Module mnTransverse Module mt = mn / cos βAxial Module mx = mn / sin βNormal Pressure Angle αn degrees = 20°Transverse Pressure Angle αt degrees = tan-1 (tan αn / cos β)Helix Angle β degrees = 15°Lead Angle λ degrees = 90 - βNumber of Teeth zProfile Shift Coefficient x = zero for Ondrives standard gearsAddendum ha mm = 1.00 · mn (for Ondrives standard gears)Dedendum hf mm = 1.25 · mn (for Ondrives standard gears)Tooth Depth h mm = 2.25 · mn (for Ondrives standard gears)Gear Ratio u = z2 / z1Centre Distance a mm = (d1 +d2) / 2Pitch Circle Diameter d mm = z · mt = (z · mn) / cos βTip Diameter da mm = d + (2mn · x) + (2 · mn)Root Diameter dr mm = da – (2 · h)Normal Pitch pn mm = π · mnTransverse Pitch pt mm = π · mt = (π · mn) / cos βAxial Pitch px mm = π · mx = (π · mn) / sin βNormal Tooth Thickness in Pitch Circle sn mm = (pn / 2) + 2mn · x · tan αnTransverse Tooth Thickness in Pitch Circle st mm = (pt / 2) + 2mn · x · tan αt = Sn / cos βWhen working with a pair of gears the subscript 1 and 2 denotes input (drive) and output (driven) gear.Tip diameter is the theoretical diameter of the gear without tooth thickness tolerance applied.For sn & st when x = zero, this is the theoretical tooth thickness. Actual tooth thickness will be less. The subscript e is for upper allowance values and i for lower allowance values.For two helical gears to run together one must be left hand and the other right hand helix.
Updated July 2021 subject to change for use as a guide only.
TorqueStated value for metal spur gears is maximum torque (T2) based on two identical gears with the same number of teeth running at standard centres. Value is minimum from surface stress or bending stress.Other factors including duty cycle and temperature will affect maximum allowable torque and service life. Wear is dependant on lubrication. We recommend that each user compute their own values based on actual operating conditions and test in application.
Gear QualityStandard gears are supplied to quality grade 7e25 DIN 3961 based on the following parameters
Radial Runout Fr =
Pitch Deviation fp =
Total Pitch Deviation Fp =
Pitch Error fu =
Ondrives manufacture gears to higher quality grades on request. Ondrives can offer testing certification of a gears individual parameters using the latest CMM machine with gear measuring software. Double and single flank testing is available on request. Please contact our technical department for details.
Comparisons of Grade StandardsExample 3 mod, 50 teeth, 30mm face width 15° helix parallel helical gear.
Working characteristicsof driving machineUniformLight ShocksModerate ShocksHeavy Shocks
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Gear TechnicalGear Technical
β
λ
da1
px
st
pt
a
d1
Crossed Axis Helical Gears
Description Symbol Unit EquationNormal Module mnTransverse Module mt = mn / cos βAxial Module mx = mn / sin βNormal Pressure Angle αn degrees = 20°Transverse Pressure Angle αt degrees = tan-1 (tan αn / cos β)Helix Angle β degrees = 45°Lead Angle λ degrees = 90 - βNumber of Teeth zProfile Shift Coefficient x = zero for Ondrives standard gearsAddendum ha mm = 1.00 · mn (for Ondrives standard gears)Dedendum hf mm = 1.25 · mn (for Ondrives standard gears)Tooth Depth h mm = 2.25 · mn (for Ondrives standard gears)Gear Ratio u = z2 / z1Centre Distance a mm = (d1 +d2) / 2Pitch Circle Diameter d mm = z · mt = (z · mn) / cos βTip Diameter da mm = d + (2mn · x) + (2 · mn)Root Diameter dr mm = da – (2 · h)Normal Pitch pn mm = π · mnTransverse Pitch pt mm = π · mt = (π · mn) / cos βAxial Pitch px mm = π · mx = (π · mn) / sin βNormal Tooth Thickness in Pitch Circle sn mm = (pn / 2) + 2mn · x · tan αnTransverse Tooth Thickness in Pitch Circle st mm = (pt / 2) + 2mn · x · tan αtWhen working with a pair of gears the subscript 1 and 2 denotes input (drive) and output (driven) gear.Tip diameter is the theoretical diameter of the gear without tooth thickness tolerance applied.For sn & st when x = zero, this is the theoretical tooth thickness. Actual tooth thickness will be less. The subscript e is for upper allowance values and i for lower allowance values.For two crossed axis helical gears to run together both must be right hand or left hand helix.
Updated July 2021 subject to change for use as a guide only.
TorqueStated value is maximum torque (T2) based on two identical gears with the same number of teeth running at standard centres. Crossed axis helical gears transmit load by point contact. The limiting condition is typically surface stress. Other factors including duty cycle and temperature will affect maximum allowable torque and service life. Wear is dependant on lubrication.We recommend that each user compute their own values based on actual operating conditions and test in application.
Working characteristicsof driving machineUniformLight ShocksModerate ShocksHeavy Shocks
Uniform1.001.101.251.50
Light Shocks1.251.351.501.75
Moderate Shocks1.501.601.752.00
Heavy Shocks1.751.852.002.25+
Working characteristics of driven machine
When selecting gears application factors should be applied to required torque. T2 > Trequired x Ka Application factor Ka
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Gear TechnicalGear Technical
d2 dr2 da2 de2
a
X N
λ
N Xd1
Worms & Wheels
Description Symbol Unit EquationAxial Module mxNormal Module mn = mx · cos λ Normal Pressure Angle αn degrees = 20°Transverse Pressure Angle αt degrees = tan-1 (tan αn / cos λ)Lead Angle λ degrees = tan-1 ((mx · z1) / d1)Helix Angle β degrees = 90 - λNumber of Starts on Worm z1Number of Teeth on Wheel z2Profile Shift Coefficient x = zero for Ondrives standard wormsAddendum ha mm = 1.00 · mx (for Ondrives standard worms)Dedendum hf mm = 1.25 · mx (for Ondrives standard worms)Tooth Depth h mm = 2.25 · mx (for Ondrives standard worms)Gear Ratio u = z2 / z1Centre Distance a mm = (d1 +d2) / 2Reference Diameter of Worm d1 mm = (mx · z1) / tan λReference Diameter of Wheel d2 mm = mx · z2Tip Diameter of Worm da1 mm = d1 + (2 · mx)Root Diameter of Worm dr1 mm = da1 – (2 · h)Tip Diameter of Wheel da2 mm = d2 + (2 · mx)Root Diameter of Wheel dr2 mm = da2 – (2 · h)Outside Diameter of Wheel de2 mm = da2 + mxNormal Pitch pn mm = π · mnAxial Pitch px mm = π · mxNormal Tooth Thickness in Pitch Circle sn mm = sx · cos λTransverse Tooth Thickness in Pitch Circle sx mm = (px / 2)QualitySteel and Stainless Steel worm = Quality 6, DIN 3974. Bronze wormwheel = Quality 7, DIN 3974. PEEK and Delrin worms = Quality 7, DIN 3974. PEEK and Delrin wormwheel = Quality 8, DIN 3974.When working with a gear set, the subscript 1 denotes a worm and 2 a wormwheel. Tip diameter is the theoretical diameter of the gear without tooth thickness tolerance applied.For sn & sx when x = zero, this is the theoretical tooth thickness. Actual tooth thickness will be less. The subscript e is for upper allowance values and i for lower allowance values.
Updated July 2021 subject to change for use as a guide only.
TorqueStated value is maximum torque based on lowest figure from surface durability, tooth root strength or wear.Values for bronze and cast iron wheel are for matching with steel 817M40 worm.Value is output torque (T2) at wheel.Tooth root failure of teeth on wheel before teeth of worm is assumed.Other factors including worm shaft deflection, duty cycle and temperature will affect maximum allowable torque and service life. Wear is dependant on lubrication.We recommend that each user compute their own values based on actual operating conditions and test in application.
Delrin POM 50%*60°C
PEEK GF30®55 - 65%*
80°CMaximum torque as % of CA104 Aluminium Bronze WheelMaximum Wheel Temperature
Working characteristicsof driving machineUniformLight ShocksModerate ShocksHeavy Shocks
Uniform1.001.101.251.50
Light Shocks1.251.351.501.75
Moderate Shocks1.501.601.752.00
Heavy Shocks1.751.852.002.25+
Working characteristics of driven machine
* Approximate value based on plastic wheel running with steel worm to allow initial selection. Testing in application will be required.Torque for anti backlash wormwheel gears is limited by the spring rating. Please contact our Technical department for details.When selecting gears application factors should be applied to required torque. T2 > Trequired x Ka Application factor Ka
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EfficiencyThe following allows an approximate value for the efficiency of the gears to be found allowing required input torque and gearforces to be calculated. Efficiency is dependant on lubrication and the figures below do not include bearing, seal and other losses.
η = tan λ / tan (λ+ pz)pz = arctan (µ)vg = (d1 · n1) / (19098 . cos λ)T1 = (T2 / u) * η
T1 = Input Torque (Nm)T2 = Output Torque (Nm)u = Ratioη = Efficiencyλ = Lead Angle (degrees)µ = Coefficient of Frictionpz = Angle of Frictionvg = Sliding Velocity (m/s)n1 = rpm of Wormd1 = Reference Diameter of Worm (mm)
Updated July 2021 subject to change for use as a guide only.
pz = arctan (µ)Ftm = Tangential force (N)Fxm = Axial force (N)Frm = Radial force (N)When working with a gear set, the subscript 1 denotes a worm and 2 a wormwheel.
Ondrives worm and wheel gears are supplied right hand lead as standard.The arrows show the direction of rotation.
Ftm1 = -Fxm2
Worms & Wheels Worms & Wheels
Gear Forces and Direction of Rotation
Frm1 = -Frm2
Ftm2 = -Fxm1
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Gear TechnicalGear Technical
da
F
hahf
δ1
δ2
d
X
Re
Bevel Gears
Description Symbol Unit EquationNormal Module mn Pressure Angle α degrees = 20°Shaft Angle Σ degrees = (90° for Ondrives standard gears)Number of Teeth z1, z2Gear Ratio u = z2 / z1Pitch Diameter of Worm d1, d2 mm = z · mnPitch Cone Angle δ1 degrees = δ1 = tan-1 (sin Σ / (u + cos Σ))Pitch Cone Angle δ2 degrees = δ2 = Σ - δ1Cone Distance Re mm = d2 / 2 sin δ2Addendum ha mm = 1.00 · mn (for Ondrives standard gears)Dedendum hf mm 0.6 to 1.0mn = 1.25 · mn (standard gears) 1.5 to 2.0mn = 1.22 · mn (standard gears) 4.0mn = 1.20 · mn (standard gears)Outside Diameter da mm = d + 2 ha · cos δPitch Apex to Crown X mm = Re cos δ - ha sin δQuality Grade 7 DIN 3965
TorqueStated value is maximum torque (T2) based on two identical gears with the same number of teeth running at standard centres. Value is minimum from surface stress or bending stress.Other factors including duty cycle and temperature will affect maximum allowable torque and service life.Wear is dependant on lubrication.We recommend that each user compute their own values based on actual operating conditions and test in application.
Ondrives can manufacture gears in a range of additional materials including bronzes, engineering plastics, special steels and stainless steels.Gears can be heat treated by a range of methods to improve performance.Please contact our Technical sales team who will be happy to discuss your specific requirements.
T: +44 1246 455500 [email protected] www.ondrives.comUpdated July 2021 subject to change for use as a guide only.
Gear TechnicalGear Technical
Delrin POM (White)DIN EN ISO 1043-1: POM C | polyacetal comopolymer.
Very good dimensional stabilitycompared to Nylon & Hostaform.Minimal absorption of moisture.
Good sliding properties.High wear resistance.
High surface hardness.High mechanical strength and stiffness
compared to Nylon & Hostaform.Can be in contact with food (FDA).
Delrin gears can be run dry or greased/oiledto improve wear.
PEEK GF30® (Light Brown)DIN EN ISO 1043-1: PEEK | polyetheretherketone.
Excellent dimensional stability.Outstanding high mechanical strength and hardness
over a broad temperature range.Shows only a slight distortion under the impact of
mechanical load and high temperature.Good electrical insulating properties.
Extremely high flame resistance.Self-extinguishing.
Very low smoke emission in a case of a fire.Can be run dry for slow speed hand operation.
Gears should be greased/oiled for all other operating conditions.
General PropertiesDensityAbsorption of MoistureMechanical propertiesYield Stress/ Tensile StrengthElongation at BreakTensile Modulus of ElasticityBall Indentation HardnessShore - HardnessCoefficient of Friction against hardened and ground steel (dry)Thermal PropertiesMelting TemperatureThermal Properties Coefficient of Linear Thermal ExpansionService Temperature, long term (min.)Service Temperature, long term (max.)Service Temperature, short termHeat Deflection TemperatureElectrical Properties Dielectric Constant Dielectric Dissipation FactorSpecific Volume ResistivitySurface ResistivityComparative Tracking Index (test solution A)Dielectric Strength
kg/m3
N/mm2
N/mm2
N/mm2
Skala D
°CW / (m · K)
10-6 K-1
°C°C°C°C
Ω · cmΩ
kV/mm
Delrin POM 14100.20%
6730.0%2800 150 81
0.10-0.30
1650.31110 -50100140110
3.800.00210131013 600 40
PEEK GF30®14900.14%
1562.7%9700 230 88
0.38-0.46
3430.43 30 -20250310315
3.200.00110141013 175 20
Materials
Updated July 2021 subject to change for use as a guide only.
The backlash figures given for spur, helical and crossed axis helical gears is the theoretical backlash for two identical gears at standard centre distance to the ISO 286 centre distance tolerance.It is given as circumferential backlash in mm measured on pitch circle diameter. An upper and lower value is quoted.Theoretical backlash is the difference between tooth thickness without and with tolerance applied.Backlash is calculated according to DIN 3967Ondrives can manufacture gears to a wide range of tolerances to suit customer application.Please contact our Technical Sales team who will be happy to discuss your specific requirements.Tooth Thickness Tolerances
Asn = Tooth thickness allowance which is the difference between measured gear tooth thickness and theoretical value measured in the normal section.
When working with a pair of gears the subscript 1 and 2 denotes input (drive) and output (driven) gear. For worm and wheel, 1 relates to the worm and 2 to the wormwheel. The subscript e is for upper allowance and i for lower allowance.Tsn = Tooth thickness tolerance measured in the normal section. (mm)Asne = Sn – SneAsni = Asne – Tsn = Sn – Sni
Circumferential Backlash jtThis is the length of arc on the pitch circle diameter through which each can be rotated whilst the other is held stationary.It is measured in the transverse section.
Units = mm & degrees
Normal Backlash jnThis is the shortest distance between the flanks of the gears when the opposite flanks are in contact.It is measured in the transverse section.For spur, helical, crossed axis helical gear Units = mm & degrees
Change in Circumferential due to Centre Distance Tolerance ∆ja Units = mm & degrees
Deviation from Centre Distance
As (mm)0.0010.0100.0150.0200.0250.0300.0350.0400.0450.050
7e/8e DIN 58405Module 0.6 to 4.07f24 DIN 3965/3967
Module 1.0 to 3.0e25 DIN 3967e25 DIN 3967e25 DIN 3967e25 DIN 3967e25 DIN 3967e25 DIN 3967
Centre Distance Tol.Js7Js7
-Js7Js8Js8
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Gear TechnicalGear Technical
*Asne is converted from base tangent length allowance (Aw) according to Aw = Asn * cos 20°
e25 DIN 3967
7e DIN 58405
Angular Backlash jθ Units = mm & degrees
d2 = Reference diameter (mm)As = Centre distance tolerance (i.e. a = 30mm Js7, As = ±0.0105mm)αn = Normal pressure angle (αn = 20°)β = Helix angle (β = zero for spur gears) Replace helix angle β with lead angle λ for worm and wheel.1° = 60 arc minutes
Example for Calculating Backlash for Two Non-Identical GearsInput Gear PSG0.5-20 7eOutput Gear PSG0.5-40 7e1. Calculate the reference diameter d for each gear PSG0.5-20 d1 = z * mn = 10.00mm PSG0.5-40 d2 = 20.00mm2. Find Asne and Tsn from the tables overleaf PSG0.5-20 Asne = -0.035mm Tsn = -0.014mm PSG0.5-40 Asne = -0.040mm Tsn = -0.016mm3. Calculate Asni for each gear PSG0.5-20 Asni = Asne - Tsn = -0.035-0.014 = -0.021mm PSG0.5-40 Asni = Asne - Tsn = -0.040-0.016 = -0.024mm4. Calculate the centre distance of the two gears and the centre distance tolerance centre distance = (10 + 20) / 2 = 15mm Js7 = ±0.009mm5. Calculate the change in backlash due to centre distance
6. Calculate the maximum backlash Remove the minus sign on Asn
7. Calculate the minimum backlash Remove the minus sign on Asn
8. Convert to angular backlash
1° = 60 arc minutes
28.208 to 13.072 arc minutes
0
0
Backlash Backlash
360 x π x d2
T: +44 1246 455500 [email protected] www.ondrives.comUpdated July 2021 subject to change for use as a guide only.
Gear TechnicalGear Technical
OverInc.
F6
F7
G6
G7
H6
H7
H8
H9
H10
H11
J6
J7
J8
JS6
JS7
JS8
K6
M6
M7
36
18102210124
16480
120
180
300
480
7505
–36
–610–84
–46
–69
–92
–6–1–90
–12
610
22132813145
20590
150
220
360
580
9005
–48
–712
–104.5
–4.57.5
–7.511
–112
–7–3
–120
–15
1018
27163416176
246
110
180
270
430
700
11006
–510–815
–125.5
–5.59
–913.5
–13.52
–9–4
–150
–18
1830
33204120207
287
130
210
330
520
840
13008
–512–920
–136.5
–6.510.5
–10.516.5
–16.52
–11–4
–170
–21
3040
4050
5065
6580
80100
100120
120140
140160
6843834339145414250
400
630
1000
1600
2500
18–726
–1441
–2212.5
–12.520
–2031.5
–31.54
–21–8
–330
–40
160180
180200
200225
7950965044156115290
460
720
1150
1850
2900
22–730
–1647
–2514.5
–14.523
–2336
–365
–24–8
–370
–46
225250
41255025259
349
160
250
390
620
1000
1600
10–614
–1124
–158
–812.5
–12.519.5
–19.53
–13–4
–200
–25
4930603029104010190
300
460
740
1200
1900
13–618
–1228
–189.5
–9.515
–1523
–234
–15–5
–240
–30
5836713634124712220
350
540
870
1400
2200
16–622
–1334
–2011
–1117.5
–17.527
–274
–18–6
–280
–35
Hole Sizes (mm)
Micrometres (10-3m)
Limits and Fits
Updated July 2021 subject to change for use as a guide only.
T: +44 1246 455500 [email protected] www.ondrives.comUpdated July 2021 subject to change for use as a guide only.
Gear TechnicalGear Technical
Keyways to DIN 6885 Js9 sliding fit. D10 free fit and P9 tight fit available on request.Woodruff keyways available on request.Standard bore tolerance H7 ISO 286. Other tolerances available.Special bore shapes available including square and hexagon.
t1
t2
b r
r
h
Modifications
Bore Size dOver
- 6 810121722303844
Bore Size dIncluding
6 81012172230384450
Keyway Sizeb x h
- 2 x 2 3 x 3 4 x 4 5 x 5 6 x 6 8 x 710 x 812 x 814 x 9
PinHole 1.5 2.0 3.0 4.0 5.0 6.0 8.010.010.010.0
TappedHole
M3 x 0.5 M3 x 0.5 M3 x 0.5 M4 x 0.7 M5 x 0.8 M6 x 1.0 M8 x 1.25 M10 x 1.5 M10 x 1.5 M12 x 1.75